19.設y=$\frac{|sinα|}{sinα}+\frac{|cosα|}{cosα}$���,根據下列條件�,分別求出角α的取值范圍.
(1)y=-2;
(2)y=0.
分析 (1)若y=$\frac{|sinα|}{sinα}+\frac{|cosα|}{cosα}$=-2.則$\left\{\begin{array}{l}sinα<0\\ cosα<0\end{array}\right.$���,解得角α的取值范圍�;
(2)若y=$\frac{|sinα|}{sinα}+\frac{|cosα|}{cosα}$=0.則$\left\{\begin{array}{l}sinα<0\\ cosα>0\end{array}\right.$����,或$\left\{\begin{array}{l}sinα>0\\ cosα<0\end{array}\right.$,解得角α的取值范圍�;
解答 解:(1)∵y=$\frac{|sinα|}{sinα}+\frac{|cosα|}{cosα}$=-2.
則$\left\{\begin{array}{l}sinα<0\\ cosα<0\end{array}\right.$,
解得:α∈(π+2kπ�����,$\frac{3π}{2}$+2kπ)(k∈Z)���,
(2)∵y=$\frac{|sinα|}{sinα}+\frac{|cosα|}{cosα}$=0.
則$\left\{\begin{array}{l}sinα<0\\ cosα>0\end{array}\right.$���,或$\left\{\begin{array}{l}sinα>0\\ cosα<0\end{array}\right.$
解得:α∈($\frac{π}{2}$+kπ,π+kπ)(k∈Z).
點評 本題考查的知識點是任意角的三角函數的定義����,解三角不等式��,難度中檔.
